Category:Riemannian geometry
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In differential geometry, Riemannian geometry is the study of smooth manifolds with Riemannian metrics; i.e. a choice of positive-definite quadratic form on a manifold's tangent spaces which varies smoothly from point to point. This gives in particular local ideas of angle, length of curves, and volume. From those some other global quantities can be derived, by integrating local contributions.
Subcategories
This category has the following 5 subcategories, out of 9 total.
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- Geodesic (mathematics) (19 P)
- Geometric flow (9 P)
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- Hodge theory (15 P)
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- Riemannian geometry stubs (44 P)
Pages in category "Riemannian geometry"
The following 106 pages are in this category, out of 139 total. This list may not reflect recent changes.
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- Santaló's formula
- Sasakian manifold
- Scalar curvature
- Schouten tensor
- Schur's lemma (Riemannian geometry)
- Second covariant derivative
- Second fundamental form
- Sectional curvature
- Sharafutdinov's retraction
- Smooth coarea formula
- Space form
- Spectral geometry
- Sphere theorem
- Spherical 3-manifold
- Spinor bundle
- Sub-Riemannian manifold
- Symmetric space
- Systolic freedom